On the Sum of the Largest Eigenvalues of a Symmetric Matrix
- 1 January 1992
- journal article
- Published by Society for Industrial & Applied Mathematics (SIAM) in SIAM Journal on Matrix Analysis and Applications
- Vol. 13 (1) , 41-45
- https://doi.org/10.1137/0613006
Abstract
The sum of the largest k eigenvalues of a symmetric matrix has a well-known extremal property that was given by Fan in 1949 [Proc. Nat. Acad. Sci., 35 (1949), pp. 652–655]. A simple proof of this property, which seems to have been overlooked in the vast literature on the subject and its many generalizations, is discussed. The key step is the observation, which is neither new nor well known, that the convex hull of the set of projection matrices of rank k is the set of symmetric matrices with eigenvalues between 0 and 1 and summing to k. The connection with the well-known Birkhoff theorem on doubly stochastic matrices is also discussed. This approach provides a very convenient characterization for the subdifferential of the eigenvalue sum, described in a separate paper.Keywords
This publication has 11 references indexed in Scilit:
- Large-Scale Optimization of EigenvaluesSIAM Journal on Optimization, 1992
- Theory of Finite and Infinite GraphsPublished by Springer Nature ,1990
- A Short Introduction to Perturbation Theory for Linear OperatorsPublished by Springer Nature ,1982
- Convex spectral functionsLinear and Multilinear Algebra, 1981
- Another proof of a result of WestwickLinear and Multilinear Algebra, 1980
- Elementary inclusion relations for generalized numerical rangesLinear Algebra and its Applications, 1977
- The minimization of certain nondifferentiable sums of eigenvalues of symmetric matricesPublished by Springer Nature ,1975
- Some convexity theorems for matricesGlasgow Mathematical Journal, 1971
- On a Theorem of Weyl Concerning Eigenvalues of Linear Transformations IProceedings of the National Academy of Sciences, 1949
- Über quadratische Formen mit reellen KoeffizientenMonatshefte für Mathematik, 1905